From Affine A4 to Affine H2: Group Theoretical Analysis of Five-fold Tilings

Abstract

The projections of the lattices, may be used as models of quasicrystals, and the particular affine extension of the H2 symmetry as a subgroup of A4, discussed in the work, presents a different perspective to 5-fold symmetric quasicrystallography. Affine H2 is obtained as the subgroup of the affine A4. The infinite group with local dihedral symmetry of order 10 operates on the Coxeter plane of the root and weight lattices of A4 whose Voronoi cells tessellate the 4D Euclidean space possessing the affine A4 symmetry. It is shown that the projection of the Voronoi cell of the root lattice tiles the Coxeter plane with thick and thin rhombuses with the action of the affine H2 symmetry. Projection of the Voronoi cell of the weight lattice onto the Coxeter plane tessellates the plane with four different tiles: thick and thin rhombuses with different edge lengths obtained from the projection of the square faces and two types of hexagons obtained from the projection of the hexagonal faces of the Voronoi cell. Structure of the local dihedral symmetry H2 fixing a particular point on the Coxeter plane is determined.